Jacobi set

Definition

Consider two generic Morse functions f , g : M → R defined on a smooth d -manifold. Let the restriction of f to the level set g − 1 ( t ) for t ∈ R a regular value, be called f t : g − 1 ( t ) → R ; it is a Morse function. Then the Jacobi set J of f and g is J = c l { x ∈ M ∣ x  is critical point of  f t } ,

Alternatively, the Jacobi set is the collection of points where the gradients of the functions align with each other or one of the gradients vanish (cite?), for some λ ∈ R , J = { x ∈ M ∣ ∇ f ( x ) + λ ∇ g ( x ) = 0  or  λ ∇ f ( x ) + ∇ g ( x ) = 0 } .

Equivalently, the Jacobi set can be described as the collection of critical points of the family of functions f + λ g , for some λ ∈ R , J = { x ∈ M ∣ x  is a critical point of  f + λ g  or  λ f + g } .