Although white dwarfs are known with estimated masses as low as and as high as , the mass distribution is strongly peaked at , and the majority lie between . this is comparable to the Earth's radius of approximately 0.9% solar radius. A white dwarf, then, packs mass comparable to the Sun's into a volume that is typically one millionth of the Sun's; the average density of matter in a white dwarf must therefore be, very roughly, times greater than the average density of the Sun, or approximately , or 1
tonne per cubic centimetre. A typical white dwarf has a density of between 104 and . White dwarfs are composed of one of the densest forms of matter known, surpassed only by other
compact stars such as
neutron stars and the hypothetical
quark stars.
Core types A typical white dwarf star, a
CO white dwarf, is 99% carbon and oxygen by mass, with the remainder being a thin layer of He and H. Main sequence stars close to the upper mass limit of are thought to fuse carbon into neon, forming
O-Ne white dwarf stars. Very light stars, below never fuse He into carbon and oxygen so they form
He-core white dwarfs. If a carbon-oxygen white dwarf accreted enough matter to reach the
Chandrasekhar limit of about 1.44
solar masses (for a non-rotating star), it would no longer be able to support the bulk of its mass through electron degeneracy pressure The current view is that this limit is not normally attained; increasing temperature and density inside the core ignite carbon fusion as the star approaches the limit (to within about 1%) before collapse is initiated. In contrast, for a core primarily composed of oxygen, neon and magnesium, the collapsing white dwarf will typically form a
neutron star. In this case, only a fraction of the star's mass will be ejected during the collapse. If a white dwarf star accumulates sufficient material from a stellar companion to raise its core temperature enough to
ignite carbon fusion, it will undergo
runaway nuclear fusion, completely disrupting it. There are three avenues by which this detonation is theorised to happen: stable
accretion of material from a companion, the collision of two white dwarfs, or accretion that causes ignition in a shell that then ignites the core. The dominant mechanism by which Type Ia supernovae are produced remains unclear. Despite this uncertainty in how Type Ia supernovae are produced, Type Ia supernovae have very uniform properties and are useful
standard candles over intergalactic distances. Some calibrations are required to compensate for the gradual change in properties or different frequencies of abnormal luminosity supernovae at high redshift, and for small variations in brightness identified by light curve shape or spectrum.
Mass–radius relationship The relationship between the mass and radius of white dwarfs can be estimated using the nonrelativistic
Fermi gas equation of state, which gives \frac{R}{R_\odot} \approx 0.012\left ( \frac{M}{M_\odot}\right )^{-1/3} \left (\frac{\mu_e}{2}\right)^{-5/3}, where is the radius, is the mass of the white dwarf, and the subscript \odot indicates the Sun; therefore {R} / {R_\odot} is the radius in units of
solar radius and {M} / {M_\odot} is the mass in units of
solar mass. The
chemical potential, \mu_e is a thermodynamic property giving the change in energy as one electron is added or removed; it relates to the composition of the star. Numerical treatment of more complete models have been tested against observational data with good agreement. Since this analysis uses the non-relativistic formula for the kinetic energy, it is non-relativistic. When the electron velocity in a white dwarf is close to the
speed of light, the kinetic energy formula approaches where is the speed of light, and it can be shown that the Fermi gas model has no stable equilibrium in the
ultrarelativistic limit. In particular, this analysis yields the maximum mass of a white dwarf, which is: These computations all assume that the white dwarf is non-rotating. If the white dwarf is rotating, the equation of hydrostatic equilibrium must be modified to take into account the
centrifugal pseudo-force arising from working in a
rotating frame. For a uniformly rotating white dwarf, the limiting mass increases only slightly. If the star is allowed to rotate nonuniformly, and
viscosity is neglected, then, as was pointed out by
Fred Hoyle in 1947, there is no limit to the mass for which it is possible for a model white dwarf to be in static equilibrium. Not all of these model stars will be
dynamically stable. Rotating white dwarfs and the estimates of their diameter in terms of the angular velocity of rotation has been treated in the rigorous mathematical literature. The fine structure of the free boundary of white dwarfs has also been analysed mathematically rigorously.
Radiation and cooling White dwarfs have low
luminosity and therefore occupy a strip at the bottom of the
Hertzsprung–Russell diagram, a graph of stellar luminosity versus color or temperature. They should not be confused with low-luminosity objects at the low-mass end of the main sequence, such as the
hydrogen-fusing red dwarfs, whose cores are supported in part by thermal pressure, or the even lower-temperature
brown dwarfs. The visible radiation emitted by white dwarfs varies over a wide color range, from the whitish-blue color of an O-, B- or A-type main sequence star to the yellow-orange of a
late K- or early M-type star. White dwarf luminosity varies over 7 orders of magnitude, from over 100 times that of the Sun to under that of the Sun. Hot white dwarfs, with surface temperatures in excess of , have been observed to be sources of soft (i.e., lower-energy)
X-rays. This enables the composition and structure of their atmospheres to be studied by soft
X-ray and
extreme ultraviolet observations. White dwarfs also radiate
neutrinos through the
Urca process. This process has more effect on hotter and younger white dwarfs. Because neutrinos can pass easily through stellar plasma, they can drain energy directly from the dwarf's interior; this mechanism is the dominant contribution to cooling for approximately the first 20 million years of a white dwarf's existence. An outer shell of non-degenerate matter sits on top of the degenerate core. The outermost layers, which are cooler than the interior, radiate roughly as a
black body. A white dwarf remains visible for a long time, as its tenuous outer atmosphere slowly radiates the thermal content of the degenerate interior. White dwarfs have an extremely small surface area to radiate this heat from, so they cool gradually, remaining hot for a long time. Most observed white dwarfs have relatively high surface temperatures, between 8000 K and . This trend stops at extremely cool white dwarfs; few white dwarfs are observed with surface temperatures below , and one of the coolest so far observed,
WD J2147–4035, has a surface temperature of approximately 3050 K. The reason for this is that the Universe's age is finite; there has not been enough time for white dwarfs to cool below this temperature. The
white dwarf luminosity function can therefore be used to find the time when stars started to form in a region; an estimate for the age of our
galactic disk found in this way is 8 billion years. The crystal structure is thought to be a
body-centered cubic lattice. In 1995 it was suggested that
asteroseismological observations of
pulsating white dwarfs yielded a potential test of the crystallization theory, and in 2004, observations were made that suggested approximately 90% of the mass of
BPM 37093 had crystallized. Other work gives a crystallized mass fraction of between 32% and 82%. As a white dwarf core undergoes crystallization into a solid phase,
latent heat is released, which provides a source of thermal energy that delays its cooling. Another possible mechanism that was suggested to explain this
cooling anomaly in some types of white dwarfs is a solid–liquid distillation process: the crystals formed in the core are buoyant and float up, thereby displacing heavier liquid downward, thus causing a net release of gravitational energy. Chemical
fractionation between the ionic species in the plasma mixture can release a similar or even greater amount of energy. This energy release was first confirmed in 2019 after the identification of a pile up in the cooling sequence of more than white dwarfs observed with the
Gaia satellite. Low-mass helium white dwarfs (mass ), often referred to as extremely low-mass white dwarfs (ELM WDs), are formed in binary systems. As a result of their hydrogen-rich envelopes, residual hydrogen burning via the CNO cycle may keep these white dwarfs hot for hundreds of millions of years. In addition, they remain in a bloated proto-white dwarf stage for up to 2 Gyr before they reach the cooling track.
Atmosphere and spectra system Although most white dwarfs are thought to be composed of carbon and oxygen,
spectroscopy typically shows that their emitted light comes from an atmosphere that is observed to be either hydrogen or
helium dominated. The dominant element is usually at least 1000 times more abundant than all other elements. As explained by
Schatzman in the 1940s, the high
surface gravity is thought to cause this purity by gravitationally separating the atmosphere so that heavy elements are below and the lighter above. This atmosphere, the only part of the white dwarf visible to us, is thought to be the top of an envelope that is a residue of the star's envelope in the
AGB phase and may also contain material accreted from the
interstellar medium. The envelope is believed to consist of a helium-rich layer with mass no more than of the star's total mass, which, if the atmosphere is hydrogen-dominated, is overlain by a hydrogen-rich layer with mass approximately of the star's total mass. and various classification schemes have been proposed and used since then. The system currently in use was introduced by
Edward M. Sion, Jesse L. Greenstein and their coauthors in 1983 and has been subsequently revised several times. It classifies a spectrum by a symbol that consists of an initial D, a letter describing the primary feature of the spectrum followed by an optional sequence of letters describing secondary features of the spectrum (as shown in the adjacent table), and a temperature index number, computed by dividing by the
effective temperature. For example, a white dwarf with only
He lines in its spectrum and an effective temperature of could be given the classification of "DB3", or, if warranted by the precision of the temperature measurement, "DB3.5". Likewise, a white dwarf with a polarized
magnetic field, an effective temperature of , and a spectrum dominated by
He lines that also had hydrogen features could be given the classification of DBAP3. The symbols "?" and ":" may also be used if the correct classification is uncertain. Those classified as DB, DC, DO, DZ, and cool DQ have helium-dominated atmospheres. Assuming that carbon and metals are not present, which spectral classification is seen depends on the effective temperature. Between approximately to , the spectrum will be classified DO, dominated by singly ionized helium. From to , the spectrum will be DB, showing neutral helium lines, and below about , the spectrum will be featureless and classified DC. While theoretical work suggests that some types of white dwarfs may have
stellar corona, searches at X-ray and radio wavelengths, where coronae are most easily detected, have been unsuccessful. A few white dwarfs have been observed to have inhomogeneous atmosphere with one side dominated by hydrogen and the other side dominated by helium.
Metal-rich white dwarfs Around 25–33% of white dwarfs have metal lines in their spectra, which is notable because any heavy elements in a white dwarf should sink into the star's interior in just a small fraction of the star's lifetime. The prevailing explanation for metal-rich white dwarfs is that they have recently accreted rocky
planetesimals.
Magnetic field Magnetic fields in white dwarfs with a strength at the surface of 1 million
gauss (100
teslas) were predicted by
P. M. S. Blackett in 1947 as a consequence of a physical law he had proposed, which stated that an uncharged, rotating body should generate a magnetic field proportional to its
angular momentum. This putative law, sometimes called the
Blackett effect, was never generally accepted, and by the 1950s even Blackett felt it had been refuted. In the 1960s, it was proposed that white dwarfs might have magnetic fields due to conservation of total surface
magnetic flux that existed in its progenitor star phase. A surface magnetic field of 100 gauss (0.01 T) in the progenitor star would thus become a surface magnetic field of 100 × 1002 = 1 million gauss (100 T) once the star's radius had shrunk by a factor of 100. The first magnetic white dwarf to be discovered was
GJ 742 (also known as ), which was identified by James Kemp, John Swedlund, John Landstreet and
Roger Angel in 1970 to host a magnetic field by its emission of
circularly polarized light. It is thought to have a surface field of approximately 300 million gauss (30 kT). Many of the presently known magnetic white dwarfs are identified by low-resolution spectroscopy, which is able to reveal the presence of a magnetic field of 1 megagauss or more. Thus the basic identification process also sometimes results in discovery of magnetic fields. White dwarf magnetic fields may also be measured without spectral lines, using the techniques of broadband circular
polarimetry, or maybe through measurement of their frequencies of radio emission via the
electron cyclotron maser. The magnetic fields in a white dwarf may allow for the existence of a new type of
chemical bond,
perpendicular paramagnetic bonding, in addition to
ionic and
covalent bonds, though detecting molecules bonded in this way is expected to be difficult. The highly magnetized white dwarf in the binary system
AR Scorpii was identified in 2016 as the first
pulsar in which the compact object is a white dwarf instead of a neutron star. A second white dwarf pulsar was discovered in 2023. == Variability ==