The reaction is an example of a concerted pericyclic reaction. It is believed to occur via a single, cyclic transition state, with no intermediates generated during the course of the reaction. As such, the Diels–Alder reaction is governed by orbital symmetry considerations: it is classified as a [π4s + π2s] cycloaddition, indicating that it proceeds through the
suprafacial/suprafacial interaction of a 4π electron system (the diene structure) with a 2π electron system (the dienophile structure), an interaction that leads to a transition state without an additional orbital symmetry-imposed energetic barrier and allows the Diels–Alder reaction to take place with relative ease. A consideration of the reactants'
frontier molecular orbitals (FMO) makes plain why this is so. (The same conclusion can be drawn from an orbital correlation diagram or a Dewar-Zimmerman analysis.) For the more common "normal" electron demand Diels–Alder reaction, the more important of the two HOMO/LUMO interactions is that between the electron-rich diene's
ψ2 as the highest occupied molecular orbital (HOMO) with the electron-deficient dienophile's π* as the lowest unoccupied molecular orbital (LUMO). However, the HOMO–LUMO energy gap is close enough that the roles can be reversed by switching electronic effects of the substituents on the two components. In an
inverse (reverse) electron-demand Diels–Alder reaction, electron-withdrawing substituents on the diene lower the energy of its empty
ψ3 orbital and electron-donating substituents on the dienophile raise the energy of its filled π orbital sufficiently that the interaction between these two orbitals becomes the most energetically significant stabilizing orbital interaction. Regardless of which situation pertains, the HOMO and LUMO of the components are in phase and a bonding interaction results as can be seen in the diagram below. Since the reactants are in their ground state, the reaction is initiated thermally and does not require activation by light. The "prevailing opinion" is that most Diels–Alder reactions proceed through a concerted mechanism; the issue, however, has been thoroughly contested. Despite the fact that the vast majority of Diels–Alder reactions exhibit stereospecific, syn addition of the two components, a diradical intermediate has been postulated and even in water. The reaction of
cyclopentadiene and
butenone for example is 700 times faster in water relative to
2,2,4-trimethylpentane as solvent. or hydrogen-bond stabilization of the transition state. The geometry of the diene and dienophile components each propagate into stereochemical details of the product. For
intermolecular reactions especially, the preferred
positional and stereochemical relationship of substituents of the two components compared to each other are controlled by electronic effects. However, for
intramolecular Diels–Alder cycloaddition reactions, the conformational stability of the structure of the
transition state can be an overwhelming influence.
Regioselectivity Frontier molecular orbital theory has also been used to explain the regioselectivity patterns observed in Diels–Alder reactions of substituted systems. Calculation of the energy and orbital coefficients of the components' frontier orbitals provides a picture that is in good accord with the more straightforward analysis of the substituents' resonance effects, as illustrated below. In general, the regioselectivity found for both normal and inverse electron-demand Diels–Alder reaction follows the
ortho-para rule, so named, because the cyclohexene product bears substituents in positions that are analogous to the
ortho and
para positions of disubstituted arenes. For example, in a normal-demand scenario, a diene bearing an electron-donating group (EDG) at C1 has its largest HOMO coefficient at C4, while the dienophile with an electron withdrawing group (EWG) at C1 has the largest LUMO coefficient at C2. Pairing these two coefficients gives the "ortho" product as seen in case 1 in the figure below. A diene substituted at C2 as in case 2 below has the largest HOMO coefficient at C1, giving rise to the "para" product. Similar analyses for the corresponding inverse-demand scenarios gives rise to the analogous products as seen in cases 3 and 4. Examining the canonical mesomeric forms above, it is easy to verify that these results are in accord with expectations based on consideration of electron density and polarization. In general, with respect to the energetically most well-matched HOMO-LUMO pair, maximizing the interaction energy by forming bonds between centers with the largest frontier orbital coefficients allows the prediction of the main regioisomer that will result from a given diene-dienophile combination. However, cases where the resonance argument and the matching of largest orbital coefficients disagree are rare.
Stereospecificity and stereoselectivity Diels–Alder reactions, as concerted cycloadditions, are
stereospecific. Stereochemical information of the diene and the dienophile are retained in the product, as a
syn addition with respect to each component. For example, substituents in a
cis (
trans, resp.) relationship on the double bond of the dienophile give rise to substituents that are
cis (
trans, resp.) on those same carbons with respect to the cyclohexene ring. Likewise,
cis,
cis- and
trans,
trans-disubstituted dienes give
cis substituents at these carbons of the product whereas
cis,
trans-disubstituted dienes give
trans substituents: ;
endo/
exo product ratio for this and various other dienophiles|alt=|thumb Diels–Alder reactions in which adjacent stereocenters are generated at the two ends of the newly formed single bonds imply two different possible stereochemical outcomes. This is a
stereoselective situation based on the relative orientation of the two separate components when they react with each other. In the context of the Diels–Alder reaction, the transition state in which the most significant substituent (an electron-withdrawing and/or conjugating group) on the dienophile is oriented towards the diene π system and slips under it as the reaction takes place is known as the
endo transition state. In the alternative
exo transition state, it is oriented away from it. (There is a more general usage of the terms
endo and exo in stereochemical nomenclature.) In cases where the dienophile has a single electron-withdrawing / conjugating substituent, or two electron-withdrawing / conjugating substituents
cis to each other, the outcome can often be predicted. In these "normal demand" Diels–Alder scenarios, the
endo transition state is typically preferred, despite often being more sterically congested. This preference is known as the
Alder endo rule. As originally stated by Alder, the transition state that is preferred is the one with a "maximum accumulation of double bonds."
Endo selectivity is typically higher for rigid dienophiles such as
maleic anhydride and
benzoquinone; for others, such as
acrylates and
crotonates, selectivity is not very pronounced. The most widely accepted explanation for the origin of this effect is a favorable interaction between the π systems of the dienophile and the diene, an interaction described as a
secondary orbital effect, though
dipolar and
van der Waals attractions may play a part as well, and solvent can sometimes make a substantial difference in selectivity. The secondary orbital overlap explanation was first proposed by Woodward and Hoffmann. In this explanation, the orbitals associated with the group in conjugation with the dienophile double-bond overlap with the interior orbitals of the diene, a situation that is possible only for the
endo transition state. Although the original explanation only invoked the orbital on the atom α to the dienophile double bond, Salem and Houk have subsequently proposed that orbitals on the α and β carbons both participate when molecular geometry allows. Often, as with highly substituted dienes, very bulky dienophiles, or
reversible reactions (as in the case of
furan as diene), steric effects can override the normal
endo selectivity in favor of the
exo isomer.
The diene The
diene component of the Diels–Alder reaction can be either open-chain or cyclic, and it can host many different types of substituents. A bulky substituent at the C2 or C3 position can increase reaction rate by destabilizing the s-
trans conformation and forcing the diene into the reactive s-
cis conformation. 2-
tert-butyl-buta-1,3-diene, for example, is 27 times more reactive than simple butadiene. Conversely, a diene having bulky substituents at both C2 and C3 is less reactive because the steric interactions between the substituents destabilize the s-
cis conformation. An especially reactive diene is 1-methoxy-3-trimethylsiloxy-buta-1,3-diene, otherwise known as
Danishefsky's diene. It has particular synthetic utility as means of furnishing α,β–unsaturated
cyclohexenone systems by elimination of the 1-methoxy substituent after deprotection of the enol silyl ether. Other synthetically useful derivatives of Danishefsky's diene include 1,3-alkoxy-1-trimethylsiloxy-1,3-butadienes (Brassard dienes) and 1-dialkylamino-3-trimethylsiloxy-1,3-butadienes (Rawal dienes). The increased reactivity of these and similar dienes is a result of synergistic contributions from donor groups at C1 and C3, raising the HOMO significantly above that of a comparable monosubstituted diene. Unstable (and thus highly reactive) dienes can be synthetically useful, e.g.
o-
quinodimethanes can be generated in situ. In contrast, stable dienes, such as
naphthalene, require forcing conditions and/or highly reactive dienophiles, such as
N-phenylmaleimide.
Anthracene, being less aromatic (and therefore more reactive for Diels–Alder syntheses) in its central ring can form
a 9,10 adduct with
maleic anhydride at 80 °C and even with
acetylene, a weak dienophile, at 250 °C.
The dienophile In a normal demand Diels–Alder reaction, the dienophile has an electron-withdrawing group in conjugation with the alkene; in an inverse-demand scenario, the dienophile is conjugated with an electron-donating group. Other such functionalities are
phosphonium substituents (yielding exocyclic double bonds after
Wittig reaction), various
sulfoxide and
sulfonyl functionalities (both are acetylene equivalents), and
nitro groups (ketene equivalents). ==Variants on the classical Diels–Alder reaction==