Isomonodromic Laplace transform with coalescing eigenvalues and confluence of Fuchsian singularities

Abstract: We consider a Pfaffian system expressing isomonodromy of an irregular system of Okubo type, depending on complex deformation parameters $$u=(u_1,\ldots ,u_n)$$ u = ( u 1 , … , u n ) … Show more

“…While in [35] both the irregular system (1.4) and the Fuchsian system have the same dimension, in our case the irregular system (1.4) has n " 3 , while the Fuchsian system (1.2) is 2-dimensional. Thus, in the proof of Theorem 3.1 we will exploit the results of [35] in order to properly express the monodromy matrices of the 2-dimensional system (1.2) in terms of the connection coefficients of the 3-dimensional Fuchsian system associated with (1.4) by Laplace transform. The main technical difficulty will be that the selected solutions of the 3-dimensional Fuchsian system may be not linearly independent.…”

“…The proof of Theorem 3.1 is based on the isomonodromic Laplace transform [35], relating an n dimensional isomonodromic system of the type (1.4) to an isomonodromic Fuchsian system of the same dimension, with poles at λ " u k , k " 1, ..., n. The latter admits certain selected vector solutions, whose monodromy can be written in terms of certain connection coefficients. In [35], the connection coefficients are expressed as linear functions of the entries of the Stokes matrices of the n-dimensional (1.4) and vice-versa, including the coalescent case. While in [35] both the irregular system (1.4) and the Fuchsian system have the same dimension, in our case the irregular system (1.4) has n " 3 , while the Fuchsian system (1.2) is 2-dimensional.…”

“…In [35], the connection coefficients are expressed as linear functions of the entries of the Stokes matrices of the n-dimensional (1.4) and vice-versa, including the coalescent case. While in [35] both the irregular system (1.4) and the Fuchsian system have the same dimension, in our case the irregular system (1.4) has n " 3 , while the Fuchsian system (1.2) is 2-dimensional. Thus, in the proof of Theorem 3.1 we will exploit the results of [35] in order to properly express the monodromy matrices of the 2-dimensional system (1.2) in terms of the connection coefficients of the 3-dimensional Fuchsian system associated with (1.4) by Laplace transform.…”

“…As a consequence of theorem 1.1. of [7], in order to compute the monodromy data of system (1.4), it suffices to compute the data of dY dz " ˆU pu c q `V pu c q z ˙Y, (1.12) which is simpler than (1.4) at generic u. 4 The above results have been re-obtained in [35] using the isomonodromic Laplace transform (this is the point of view used here to prove Theorem 3.1).…”

The sixth Painleve' equation as isomonodromy deformation of an irregular system: monodromy data, coalescing eigenvalues, locally holomorphic transcendents and Frobenius manifolds

“…While in [35] both the irregular system (1.4) and the Fuchsian system have the same dimension, in our case the irregular system (1.4) has n " 3 , while the Fuchsian system (1.2) is 2-dimensional. Thus, in the proof of Theorem 3.1 we will exploit the results of [35] in order to properly express the monodromy matrices of the 2-dimensional system (1.2) in terms of the connection coefficients of the 3-dimensional Fuchsian system associated with (1.4) by Laplace transform. The main technical difficulty will be that the selected solutions of the 3-dimensional Fuchsian system may be not linearly independent.…”

“…The proof of Theorem 3.1 is based on the isomonodromic Laplace transform [35], relating an n dimensional isomonodromic system of the type (1.4) to an isomonodromic Fuchsian system of the same dimension, with poles at λ " u k , k " 1, ..., n. The latter admits certain selected vector solutions, whose monodromy can be written in terms of certain connection coefficients. In [35], the connection coefficients are expressed as linear functions of the entries of the Stokes matrices of the n-dimensional (1.4) and vice-versa, including the coalescent case. While in [35] both the irregular system (1.4) and the Fuchsian system have the same dimension, in our case the irregular system (1.4) has n " 3 , while the Fuchsian system (1.2) is 2-dimensional.…”

“…In [35], the connection coefficients are expressed as linear functions of the entries of the Stokes matrices of the n-dimensional (1.4) and vice-versa, including the coalescent case. While in [35] both the irregular system (1.4) and the Fuchsian system have the same dimension, in our case the irregular system (1.4) has n " 3 , while the Fuchsian system (1.2) is 2-dimensional. Thus, in the proof of Theorem 3.1 we will exploit the results of [35] in order to properly express the monodromy matrices of the 2-dimensional system (1.2) in terms of the connection coefficients of the 3-dimensional Fuchsian system associated with (1.4) by Laplace transform.…”

“…As a consequence of theorem 1.1. of [7], in order to compute the monodromy data of system (1.4), it suffices to compute the data of dY dz " ˆU pu c q `V pu c q z ˙Y, (1.12) which is simpler than (1.4) at generic u. 4 The above results have been re-obtained in [35] using the isomonodromic Laplace transform (this is the point of view used here to prove Theorem 3.1).…”

The sixth Painleve' equation as isomonodromy deformation of an irregular system: monodromy data, coalescing eigenvalues, locally holomorphic transcendents and Frobenius manifolds

“…In the work [13], and in the related [12,18,19,20,21], we have studied an n ˆn matrix differential system of the shape (1.1) below, with an irregular singularity at z " 8 and a Fuchsian one at z " 0, whose leading term at 8 is a diagonal matrix Λ " diagpu 1 , ..., u n q, whose eignevalus u " pu 1 , ..., u n q vary in a polydisc of C n . The polydisc contains a coalescence locus, where some eigenvalues merge, namely u j ´uk Ñ 0 for some j ‰ k. For this system, we have proved that a monodromy preserving deformation theory can be well defined (in an analytic way) with constant monodromy data on the whole polydisc, including the coalescence locus.…”

Isomonodromic deformations along a stratum of the coalescence locus

Introduction