Is the full susceptibility of the square-lattice Ising model a differentially algebraic function?

Abstract: Is the susceptibility of the Ising model differentially algebraic?2 Key-words:non-holonomic functions, differentially algebraic functions, differentially transcendental functions, closure properties, non-linear differential equations, susceptibility of the Ising model, modulo prime calculations, algebraic functions, composition of functions, diagonals of rational functions, algebraic power series. ‡ No rigorous proof of this result exists, but no reasonable person doubts it. § These are known to be D-finite -s… Show more

“…This Heun example [1] could suggest that such Schwarzian differential equations emerge in physics with holonomic functions having a narrow set of singularities (three for hypergeometric functions, four for Heun functions, ...) like the Heun example in [1]. Going further we show, in this paper, that such differentially algebraic [3,4] Schwarzian equations do emerge in a much more general holonomic framework.…”

“…The identification of these two order-four linear differential operators L gives this time four conditions C n , n = 0, 1, 2, 3, corresponding, respectively, to the identification of the D n x coefficients of L (p) 4 and L (c) 4 . Eliminating once again the log-derivative v ′ (x)/v(x) between C 3 and C 2 one deduces a Schwarzian condition…”

“…where w(x) is a N -root of a rational function. At the last step we consider the identification of the constant terms in D x in L (p) 4 and L (c) 4 . After injecting in this "large" non-linear differential equation, equation (11), the Schwarzian condition (29) with W (x) given by (30), and the Calabi-Yau condition (32), we eventually find that this last "large" equation becomes independent of the pullback y(x) and reduces to a quite simple condition giving s(x) as a polynomial expression in the two coefficients p(x) and q(x) and their derivatives:…”

“…for an order-four linear differential operator, corresponding to this parametrization (such that it verifies the symmetric Calabi-Yau condition, and such that its symmetric square is of order nine), one naturally finds the Schwarzian condition (29) with (30), as well as the exact expression (31) for the conjugation function v(x). Taking into account the Schwarzian condition (29), the identification of the coefficients of D x for L = L (c) 4 . We have here a situation similar to the one described in the previous section 4.1, with the emergence of the additional condition (34) on top of the Calabi-Yau condition (32).…”

“…† Throughout the paper we consider, for clarity and simplicity, this normalized form for the linear differential operators. The "true" pullbacked operator which amounts to changing x → y(x) (see the command "dchange" in PDEtools in Maple) is in fact 1/y ′ (x) 2 · L (p) 2 where L (p) 2 is given by (4). one can eliminate the log-derivative v ′ (x)/v(x) between (6) and (7), and obtain the Schwarzian condition previously given in [1] W (x) − W (y(x)) · y ′ (x) 2 + {y(x), x} = 0, (9) where W (x) = dp(x) dx…”

Schwarzian conditions for linear differential operators with selected differential Galois groups

“…This Heun example [1] could suggest that such Schwarzian differential equations emerge in physics with holonomic functions having a narrow set of singularities (three for hypergeometric functions, four for Heun functions, ...) like the Heun example in [1]. Going further we show, in this paper, that such differentially algebraic [3,4] Schwarzian equations do emerge in a much more general holonomic framework.…”

“…The identification of these two order-four linear differential operators L gives this time four conditions C n , n = 0, 1, 2, 3, corresponding, respectively, to the identification of the D n x coefficients of L (p) 4 and L (c) 4 . Eliminating once again the log-derivative v ′ (x)/v(x) between C 3 and C 2 one deduces a Schwarzian condition…”

“…where w(x) is a N -root of a rational function. At the last step we consider the identification of the constant terms in D x in L (p) 4 and L (c) 4 . After injecting in this "large" non-linear differential equation, equation (11), the Schwarzian condition (29) with W (x) given by (30), and the Calabi-Yau condition (32), we eventually find that this last "large" equation becomes independent of the pullback y(x) and reduces to a quite simple condition giving s(x) as a polynomial expression in the two coefficients p(x) and q(x) and their derivatives:…”

“…for an order-four linear differential operator, corresponding to this parametrization (such that it verifies the symmetric Calabi-Yau condition, and such that its symmetric square is of order nine), one naturally finds the Schwarzian condition (29) with (30), as well as the exact expression (31) for the conjugation function v(x). Taking into account the Schwarzian condition (29), the identification of the coefficients of D x for L = L (c) 4 . We have here a situation similar to the one described in the previous section 4.1, with the emergence of the additional condition (34) on top of the Calabi-Yau condition (32).…”

“…† Throughout the paper we consider, for clarity and simplicity, this normalized form for the linear differential operators. The "true" pullbacked operator which amounts to changing x → y(x) (see the command "dchange" in PDEtools in Maple) is in fact 1/y ′ (x) 2 · L (p) 2 where L (p) 2 is given by (4). one can eliminate the log-derivative v ′ (x)/v(x) between (6) and (7), and obtain the Schwarzian condition previously given in [1] W (x) − W (y(x)) · y ′ (x) 2 + {y(x), x} = 0, (9) where W (x) = dp(x) dx…”

Schwarzian conditions for linear differential operators with selected differential Galois groups

Modular forms, Schwarzian conditions, and symmetries of differential equations in physics

On Christol’s conjecture