Add to ORKGLet~$X=\Po/\Gamma$ be an~$n$-punctured sphere, $n>3$. We introduce and study~$n-3$ deformation operators on the space of modular forms~$M_*(\Gamma)$ based on the classical theory of uniformizing differential equations and accessory parameters. When restricting to modular functions, we recover a construction in Teichm\"uller theory related to the deformation of the complex structure of~$X$. We describe the deformation operators in terms of derivations with respect to Eichler integrals of weight-four cusp forms, and in terms of vector-valued modular forms attached to extensions of symmetric tensor representations
AbstractMaass–Shimura operators on holomorphic modular forms preserve the modularity of modular form...
AbstractFor a fixed prime we prove structure theorems for the kernel and the image of the map that a...
We study the approach of N.M. Katz to define $p$-adic modular forms, first as sections of tensor pow...
Several topics related to modular forms and to the accessory parameter problem for the uniformizatio...
We study the accessory parameter problem for four-punctured spheres from thepoint of view of modular...
AbstractA description is given of all primitive δ-series mod p of order 1 which are eigenvectors of ...
AbstractWe prove a conjecture of Calegari and Stein regarding mod p congruences between modular form...
AbstractWe investigate differential operators and their compatibility with subgroups of SL2(R)n. In ...
AbstractWe study sums of the form ∑n⩽Na(n)e2πiαn, where α is any real number and the a(n) are the Fo...
AbstractThere is a relationship between the values of a sequence of modular functions at points in t...
AbstractFor an infinite family of modular forms constructed from Klein forms we provide certain expl...
Given Jacobi forms, we determine associated Jacobi-like forms, whose coefficients are quasimodular for...
summary:We construct a family of modular forms from harmonic Maass Jacobi forms by considering their...
Here, we give a detailed account of a proof for the estimates of Fourier coefficients of weakly hol...
Given a Hilbert cuspidal newform $g$ we construct a family of modular forms of half-integral weight ...
AbstractMaass–Shimura operators on holomorphic modular forms preserve the modularity of modular form...
AbstractFor a fixed prime we prove structure theorems for the kernel and the image of the map that a...
We study the approach of N.M. Katz to define $p$-adic modular forms, first as sections of tensor pow...
Several topics related to modular forms and to the accessory parameter problem for the uniformizatio...
We study the accessory parameter problem for four-punctured spheres from thepoint of view of modular...
AbstractA description is given of all primitive δ-series mod p of order 1 which are eigenvectors of ...
AbstractWe prove a conjecture of Calegari and Stein regarding mod p congruences between modular form...
AbstractWe investigate differential operators and their compatibility with subgroups of SL2(R)n. In ...
AbstractWe study sums of the form ∑n⩽Na(n)e2πiαn, where α is any real number and the a(n) are the Fo...
AbstractThere is a relationship between the values of a sequence of modular functions at points in t...
AbstractFor an infinite family of modular forms constructed from Klein forms we provide certain expl...
Given Jacobi forms, we determine associated Jacobi-like forms, whose coefficients are quasimodular for...
summary:We construct a family of modular forms from harmonic Maass Jacobi forms by considering their...
Here, we give a detailed account of a proof for the estimates of Fourier coefficients of weakly hol...
Given a Hilbert cuspidal newform $g$ we construct a family of modular forms of half-integral weight ...
AbstractMaass–Shimura operators on holomorphic modular forms preserve the modularity of modular form...
AbstractFor a fixed prime we prove structure theorems for the kernel and the image of the map that a...
We study the approach of N.M. Katz to define $p$-adic modular forms, first as sections of tensor pow...