Extended Metric-Affine $f(R)$ Gravity with Dynamical Connection in Vacuum

Damianos Iosifidis
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Abstract

We extend the usual vacuum Metric-Affine $f(R)$ Gravity by supplementing it with all parity even quadratic invariants in torsion and non-metricity. As we show explicitly this supplementation drastically changes the status of the Theory which now propagates an additional scalar degree of freedom on top of the graviton. This scalar degree of freedom has a geometric origin as it relates to spacetime torsion and non-metricity. The resulting Theory can be written equivalently as a metric and torsionless Scalar-Tensor Theory whose potential and kinetic term coupling depend on the choice of the function $f(R)$ and the dimensionless parameters of the quadratic invariants respectively.
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具有真空动态连接的扩展公元-阿芬$f(R)$引力
我们扩展了通常的真空公设-非公设 $f(R)$引力,为其补充了扭转和非公设的所有奇偶二次不变式。我们可以清楚地看到,这种补充极大地改变了理论的状态,现在它在引力子之上传播了一个额外的标量自由度。这个标量自由度与时空扭转和非度量有关,因此具有几何起源。由此产生的理论可以等价地写成一个度量和无扭的标量张量理论,它的势项和动项耦合分别取决于函数$f(R)$和二次不变式的无量纲参数的选择。
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