# The vectorial Ribaucour transformation for submanifolds of constant   sectional curvature

**Authors:** Daniel Guimar\~aes, Ruy Tojeiro

arXiv: 1706.02405 · 2017-06-09

## TL;DR

This paper introduces an $L$-transformation that preserves constant sectional curvature in submanifolds, enabling systematic construction and decomposition of such submanifolds using linear PDE solutions and generalizing classical transformations.

## Contribution

It develops a reduction of the vectorial Ribaucour transformation called the $L$-transformation, extending classical surface transformations to higher-dimensional submanifolds with constant curvature.

## Key findings

- Established a decomposition theorem generalizing permutability formulas.
- Derived a Bianchi-cube theorem for constructing complex families of submanifolds.
- Provided explicit algebraic formulas for generating submanifolds with constant curvature.

## Abstract

We obtain a reduction of the vectorial Ribaucour transformation that preserves the class of submanifolds of constant sectional curvature of space forms, which we call the $L$-transformation. It allows to construct a family of such submanifolds starting with a given one and a vector-valued solution of a system of linear partial differential equations. We prove a decomposition theorem for the $L$-transformation, which is a far-reaching generalization of the classical permutability formula for the Ribaucour transformation of surfaces of constant curvature in Euclidean three space. As a consequence, we derive a Bianchi-cube theorem, which allows to produce, from $k$ initial scalar $L$-transforms of a given submanifold of constant curvature, a whole $k$-dimensional cube all of whose remaining $2^k-(k+1)$ vertices are submanifolds with the same constant sectional curvature given by explicit algebraic formulae. We also obtain further reductions, as well as corresponding decomposition and Bianchi-cube theorems, for the classes of $n$-dimensional flat Lagrangian submanifolds of $\mathbb{C}^n$ and $n$-dimensional Lagrangian submanifolds with constant curvature $c$ of the complex projective space $\mathbb C\mathbb P^n(4c)$ or the complex hyperbolic space $\mathbb C\mathbb H^n(4c)$ of complex dimension $n$ and constant holomorphic curvature~4c.

## Full text

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## References

16 references — full list in the complete paper: https://tomesphere.com/paper/1706.02405/full.md

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Source: https://tomesphere.com/paper/1706.02405