Definition 3.1.

A distribution g ∈ S(ℝⁿ⁺¹) is parabolic homogeneous of degree m, m ∈ Z, if for any λ ≠ 0, we have g_λ = λ^mg.

Let ℂ₋ denote the complex halfplane {Imτ < 0} with closure 𝔺-¯. Then:

Lemma 3.2.

[5] Let q(ξ, τ) ∈ C^∞((ℝⁿ × ℝ)/0) be a parabolic homogeneous symbol of degree m such that:

1. (i)

   q extends to a continuous function on (𝕉n×𝔺-¯)\0 in such way to be holomorphic in the last variable when the latter is restricted to ℂ₋. Then there is a unique g ∈ S(ℝⁿ⁺¹) agreeing with q on ℝⁿ⁺¹\0 so that:

2. (ii)

   g is homogeneous of degree m;

3. (iii)

   The inverse Fourier transform g⌣(x,t) vanishes for t < 0.

Let U be an open subset of ℝⁿ. We define Volterra symbols and Volterra ΨDOs on U × ℝⁿ⁺¹\0 as follows.

Definition 3.3.

S Vm(U×𝕉n+1), m∈𝕑, consists in smooth functions q(x, ξ, τ) on U × ℝⁿ × ℝ with an asymptotic expansion q∼∑j≥0qm-j, where:

1. (i)

   q_l ∈ C^∞(U × [(ℝⁿ × ℝ)/0] is a homogeneous Volterra symbol of degree l, i.e. q_l is parabolic homogeneous of degree l and satisfies the property (i) in Lemma 2.3 with respect to the last n + 1 variables;

2. (ii)

   The sign ~ means that, for any integer N and any compact K, U, there is a constant C_NKαβk > 0 such that for x ∈ K and for |ξ|+|τ|12>1 we have

   |∂ xα∂ ξβ∂ τk(q-∑j<Nqm-j)(x,ξ,τ)|≤CNKαβk(|ξ|+|τ|12)m-N-|β|-2k. (3.9)

Definition 3.4.

Ψ Vm(U×𝕉), m∈𝕑, consists in continuous operators Q₀ from C c∞(Ux×𝕉t) to C^∞(U_x × ℝ_t) such that:

1. (i)

   Q₀ has the Volterra property;

2. (ii)

   Q₀ = q(x, D_x, D_t) + R for some symbol q in S Vm(U×𝕉) and some smoothing operator R.

In what follows, if Q₀ is a Volterra ΨDO, we let K_Q0 (x, y, t − s) denote its distribution kernel, so that the distribution K_Q0 (x, y, t) vanishes for t < 0.

Definition 3.5.

Let q_m(x, ξ, τ) ∈ C^∞(U × (ℝⁿ⁺¹/0)) be a homogeneous Volterra symbol of order m and let g_m ∈ C^∞(U) ⊗ 𝕊′(ℝⁿ⁺¹) denote its unique homogeneous extension given by Lemma 2.3. Then:

1. (i)

   q⌣m(x,y,t) is the inverse Fourier transform of g_m(x, ξ, τ) in the last n + 1 variables;

2. (ii)

   q_m(x, D_x, D_t) is the operator with kernel q⌣m(x,y-x,t).

Proposition 3.6.

([5,13]) The following properties hold.

1. 1)

   Composition. Let Qj∈Ψ Vmj(U×𝕉), j=1,2 have symbol q_j and suppose that Q₁ or Q₂ is properly supported. Then Q₁Q₂ is a Volterra ΨDO of order m₁ + m₂ with symbol q1∘q2∼∑ 1α!∂ ξαq1D xαq2.

2. 2)

   Parametrices. An operator Q is the order m Volterra ΨDO with the paramatrix P then

   QP=1-R1,   PQ=1-R2 (3.10)

   where R₁, R₂ are smoothing operators.

Proposition 3.7.

([5,13]) The differential operator D˜ E2+∂t is invertible and its inverse (D˜ E2+∂t)-1 is a Volterra ΨDO of order −2.

We denote by M^ϕ the fixed-point set of ϕ, and for a = 0, ⋯, n, we let Mϕ=∪0≤a≤nM aϕ, where M aϕ is an a-dimensional submanifold. Given a fixed-point x₀ in a component M aϕ, consider some local coordinates x = (x¹, ⋯, x^a) around x₀. Setting b = n − a, we may further assume that over the range of the domain of the local coordinates there is an orthonormal frame e₁(x), ⋯, e_b(x) of N zϕ. This defines fiber coordinates v = (v₁, ⋯, v_b). Composing with the map (x, v) ∈ N^ϕ (ε₀) exp_x(v) we then get local coordinates x¹, ⋯, x^a, v¹, ⋯, v^b for M near the fixed point x₀. We shall refer to this type of coordinates as tubular coordinates. Then N^ϕ(ε₀) is homeomorphic with a tubular neighborhood of M^ϕ. Set i_M^ϕ: M^ϕ ↪ M be an inclusion map. Since dϕ preserves E and E^⊥, considering the oriented (local) orthonormal basis {f₁, ⋯, f_k, h₁, ⋯, h_n−k}, set

Let

The aim of this section is to prove the following result.

Theorem 3.8.

(Local Equivariant Sub-Signature Index Theorem. Even Dimension)

Let x₀ ∈ M^ϕ, then

Next we give a detailed proof of Theorem 3.9. Let Q=(D˜ E2+∂t)-1. For x ∈ M^ϕ and t > 0 set

Here we use a trivialization over ∧ (T^*M) about the tubular coordinates. Using the tubular coordinates, we have

Let

We mention the following result

Proposition 3.9.

[19] Let Q∈Ψ Vm(M×𝕉,∧(T*M)), m∈𝕑. Uniformly on each component M aϕ

Similar to Theorem 1.2 in [15] and Section 2 (d) in [8], we have

We will compute the local index in this trivialization. Let (V, q) be a finite dimensional real vector space equipped with a quadratic form. Let C(V, q) be the associated Clifford algebra, i.e., the associative algebra generated by V with the relations v · w + w · v = −2q(v, w) for v, w ∈ V. Let {e₁, ⋯, e_n} be an orthomormal basis of (V, q), let C(V,q)⊗^C(V,-q) be the grading tensor product of C(V, q) and C(V, −q), and ∧*V⊗^∧*V be the grading tensor product of ∧^*V and ∧^*V. Define the symbol map:

The tensor product of these representations yields an isomorphism of superalgebras

Lemma 3.10.

For 1 ≤ i₁ < ⋯ < i_p ≤ n, 1 ≤ j₁ < ⋯ < j_q ≤ n, when p = q = n,

We will also denote the volume element in ∧V⊗^∧V by ω=e1∧⋯∧en∧e^1∧⋯∧e^n. For a∈∧V⊗^∧V, let Ta be the coefficient of ω. The linear functional T:∧V⊗^∧V→R is called the Berezin trace. Then for a a∈C(V,q)⊗^(V,.q), we have Strs(a)=(-1)n(n+1)22n(Tσ)(a). We define the Getzler order as follows:

Let Q∈Ψ V*(𝕉n×𝕉,∧*T*M) have symbol

The symbol xαα!σ[∂ xαqk(0,ξ,τ)](j,l) is the Getzler homogeneous of k + j − |α|. Therefore, we can expand σ [q(x, ξ, τ)] as

Definition 3.11.

The integer m is called as the Getzler order of Q. The symbol q_(m) is the principal Getzler homogeneous symbol of Q. The operator Q_(m) = q_(m)(x, D_x, D_t) is called the model operator of Q.

Let e₁,..., e_n be an oriented orthonormal basis of T_x0M such that e₁, ⋯, e_a span T_x0M^ϕ and e_a+1, ⋯, e_n span N x0ϕ. This provides us with normal coordinates (x₁, ⋯, x_n) → exp_x0 (x¹e₁ +⋯+xⁿe_n). Moreover using parallel translation enables us to construct a synchronous local oriented tangent frame e₁(x), ..., e_n(x) such that e₁(x), ⋯, e_a(x) form an oriented frame of TM aϕ and e_a+1(x), ⋯, e_n(x) form an (oriented) frame N^τ (when both frames are restricted to M^ϕ). This gives rise to trivializations of the tangent and exterior algebra bundles. Write

Let ∧(n) = ∧^∗ℝⁿ be the exterior algebra of ℝⁿ. We shall use the following gradings on ∧(n)⊗^∧(n),

Let A∈Cl(V,q)⊗^Cl(V,-q), then

In order to calculate Str[ϕ˜A], we need to consider the representation of |σ(ϕ˜)((0,b),(0,l2))σ(A)((a,0),(a,b-l2))|(n,n). Let the matrix ϕ^N equal

From Lemma 3.2 in [26], then

Lemma 3.12.

We have

Then we obtain

Next we calculate |σ (A)|^{((a,0),(a,b−l₂))}. In the following, we shall use the following “curvature forms”: R′ ≔ (R_i,j)_1≤i,j≤a, R″ ≔ (R_a+i,a+j)_1≤i,j≤b. Let

By (2.19), let F=D˜ E2, we get

Proposition 3.13.

The model operator of F is