Robert Root-Bernstein and colleagues Robert Root-Bernstein is considered the principal responsible for rekindling interest in polymathy in the scientific community. His works emphasize the contrast between the polymath and two other types: the specialist and the dilettante. The specialist demonstrates depth but lacks breadth of knowledge. The dilettante demonstrates superficial breadth but tends to acquire skills merely "for their own sake without regard to understanding the broader applications or implications and without integrating it". Conversely, the polymath is a person with a level of expertise that is able to "put a significant amount of time and effort into their avocations and find ways to use their multiple interests to inform their vocations". A key point in the work of Root-Bernstein and colleagues is the argument in favor of the universality of the creative process. That is, although creative products, such as a painting, a mathematical model or a poem, can be domain-specific, at the level of the creative process, the mental tools that lead to the generation of creative ideas are the same, be it in the arts or science. Root-Bernstein and colleagues' research is an important counterpoint to the claim by some psychologists that creativity is a domain-specific phenomenon. Through their research, Root-Bernstein and colleagues conclude that there are certain comprehensive thinking skills and tools that cross the barrier of different domains and can foster creative thinking: "[creativity researchers] who discuss integrating ideas from diverse fields as the basis of creative giftedness ask not 'who is creative?' but 'what is the basis of creative thinking?' From the polymathy perspective, giftedness is the ability to combine disparate (or even apparently contradictory) ideas, sets of problems, skills, talents, and knowledge in novel and useful ways. Polymathy is therefore the main source of any individual's creative potential".
Peter Burke Peter Burke, professor emeritus of Cultural History and Fellow of Emmanuel College at Cambridge, discussed the theme of polymathy in some of his works. He has presented a comprehensive historical overview of the ascension and decline of the polymath as, what he calls, an "intellectual species". He observes that in ancient and medieval times, scholars did not have to specialize. However, from the 17th century on, the rapid rise of new knowledge in the Western world—both from the systematic investigation of the natural world and from the flow of information coming from other parts of the world—was making it increasingly difficult for individual scholars to master as many disciplines as before. Thus, an intellectual retreat of the polymath species occurred: "from knowledge in every [academic] field to knowledge in several fields, and from making original contributions in many fields to a more passive consumption of what has been contributed by others". Given this change in the intellectual climate, it has since then been more common to find "passive polymaths", who consume knowledge in various domains but make their reputation in one single discipline, than "proper polymaths", who—through a feat of "intellectual heroism"—manage to make serious contributions to several disciplines. However, Burke warns that in the age of specialization, polymathic people are more necessary than ever, both for synthesis—to paint the big picture—and for analysis. He says: "It takes a polymath to 'mind the gap' and draw attention to the knowledges that may otherwise disappear into the spaces between disciplines, as they are currently defined and organized".
Bharath Sriraman Bharath Sriraman, of the University of Montana, also investigated the role of polymathy in education. He poses that an ideal education should nurture talent in the classroom and enable individuals to pursue multiple fields of research and appreciate both the
aesthetic and structural/scientific connections between mathematics, arts and the sciences. In 2009, Sriraman published a paper reporting a 3-year study with 120
pre-service mathematics teachers and derived several implications for mathematics pre-service education as well as
interdisciplinary education. Based on their earlier four-c model of creativity, Beghetto and Kaufman proposed a typology of polymathy, ranging from the ubiquitous mini-c polymathy to the eminent but rare Big-C polymathy, as well as a model with some requirements for a person (polymath or not) to be able to reach the highest levels of creative accomplishment. They account for three general requirements—intelligence, motivation to be creative, and an environment that allows creative expression—that are needed for any attempt at creativity to succeed. Then, depending on the domain of choice, more specific abilities will be required. The more that one's abilities and interests match the requirements of a domain, the better. While some will develop their specific skills and motivations for specific domains, polymathic people will display intrinsic motivation (and the ability) to pursue a variety of subject matters across different domains. He contrasts this polymathic nature against what he calls "the cult of specialisation". For example, education systems stifle this nature by forcing learners to specialise in narrow topics. Another study found that children scored higher in
IQ tests after having drum lessons, and he uses such research to argue that diversity of domains can enhance a person's general intelligence. Ahmed cites many historical claims for the advantages of polymathy. Some of these are about general intellectual abilities that polymaths apply across multiple domains. For example,
Aristotle wrote that full understanding of a topic requires, in addition to subject knowledge, a general critical thinking ability that can assess how that knowledge was arrived at. Another advantage of a polymathic mindset is in the application of multiple approaches to understanding a single issue. Ahmed cites biologist
E. O. Wilson's view that reality is approached not by a single academic discipline but via a
consilience between them. One argument for studying multiple approaches is that it leads to
open-mindedness. Within any one perspective, a question may seem to have a straightforward, settled answer. Someone aware of different, contrasting answers will be more open-minded and aware of the limitations of their own knowledge. The importance of recognising these limitations is a theme that Ahmed finds in many thinkers, including
Confucius,
Ali ibn Abi Talib, and
Nicolas of Cusa. He calls it "the essential mark of the polymath." A further argument for multiple approaches is that a polymath does not see diverse approaches as diverse, because they see connections where other people see differences. For example
da Vinci advanced multiple fields by applying mathematical principles to each. ==Related terms==